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Abstract algebra A. Assume G is an abelian group. Let n > 0 be an integer....
Abstract Algebra (Direct Products of Groups) Let G1, G2 and H be finitely generated abelian groups. Prove that if G1 XHG2 x H, then G G2
Let G be an Abelian group. Define ∅: G + G by ∅(g, h) = g2h. Prove that ∅ is a homomorphism and that ∅ is onto.
22 Must the center of a group be Abelian? 23. Let G be an Abelian group with identity e and let n be some integer Prove that the set of all élements of G that satisfy the equation* - e is a subgroup of G. Give an example of a group G in which the set of all elements of G that satisfy the equation :2 -e does not form a subgroup of G. (This exercise is referred to in...
7. Let A be a Abelian group of finite order n and let m be a natural number. Define a map Om : A + A by Om(a) = a". Prove that Om is a homomorphism of A and identify the kernel of øm. Determine when om is an isomorphism.
9) A group G is called solvable if there is a sequence of subgroups such that each quotient Gi/Gi-1 is abelian. Here Gi-1 Gi means Gi-1 is a normal subgroup of Gi. For example, any abelian group is solvable: If G s abelian, take Go f1), Gi- G. Then G1/Go G is abelian and hence G is solvable (a) Show that S3 is solvable Suggestion: Let Go- [l),Gı-(123)), and G2 -G. Here (123)) is the subgroup generated by the 3-cycle...
Abstract algebra thx a lot 1. Prove that the formula a *b= a2b2 defines a binary operation on the set of all reals R. Is this operation associative? Justify. (10 points) 2. Let G be a group. Assume that for every two elements a and b in G (ab)2ab2 Prove that G is an abelian group. (10 points)
Let G be an abelian group and n be a fixed positive integer. LetH={gn|g∈G}andK={x∈G|xn =e},show tha tH<G and K<G. Extra challenge: Show that the statement may not be true when G is not abelian
Abstract Algebra 1 a) Prove that if G is a cyclic group of prime order than G has exactly two subgroups. What are they? 1 b) Let G be a group and H a subgroup of G. Let x ∈ G. Proof that if for a, b ∈ H and ax = b then x ∈ H. (If you use any group axioms, show them)
(7 marks) Let n be a positive integer and let G be a group such that there is a surjective homomorphism from G onto the symmetric group Sn. Show that G has a normal subgroup of index 2.
2. Let p: G -G be a surjective group homomorphism (a) Show that if G is abelian then G' is abelian. (b) Show that if G' is cyclic then there is a surjective homomorphism from (Z, +, 0) to G'. (Hint: use the fact that Z is generated by 1 and G' has a generator). (c) Use Part (a) and (b) to show that every cyclic group is abelian.